Warm up… Write the converse, inverse, and contrapositive. Whole numbers that end in zero are even. Write as a biconditional. The whole numbers are the.

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Presentation transcript:

Warm up… Write the converse, inverse, and contrapositive. Whole numbers that end in zero are even. Write as a biconditional. The whole numbers are the nonnegative integers.

Answer If a number is even then it is a whole number that ends in zero If a whole number does not end in zero then it is not even If a number is not even then it is not a whole number that ends in zero. A number is a whole number iff it is a nonnegative integer.

2.3 Deductive Reasoning

SWBAT To use the law of detachment To use the law of syllogism

Conditional Statement If the sun is out (p), then the weather is good(q). Symbolically written as If p, then q or p → q Converse, simply switch p and q. If q, then p or q → p

Biconditional Statement Written symbolically: If p, then q and if q, then p. or p  q Most often written in this form: p if and only if q.

Example 1: Using Symbolic Notation Let p be “the value of x is -5” and let q be “the absolute value of x is 5.” A. Write p → q in words. B. Write q → p in words. C. Decide whether the biconditional statement p  q is true.

Solution A. If the value of x is -5, then the absolute value of x is 5. B. If the absolute value of x is 5, then the value of x is -5. C. The conditional statement in part a is true, but its converse (b) is false. So, the biconditional p  q is false.

Symbol for negation When writing negation, use the  symbol.  3 measures 90° : p  3 is not acute : q Negation:  3 does not measure 90°  p Negation:  3 is acute --  q

Example 2: Writing an inverse and contrapositive Let p be “it is raining” and let q be “the soccer game is cancelled.” Write the contrapositive of p → q Write the inverse of p → q Answers ~q → ~p—If the soccer game is not canceled, then it is not raining. ~p → ~q—If it is not raining, then the soccer game is not canceled.

REMEMBER A CONDITIONAL STATEMENT is equivalent to its contrapositive and that the converse and inverse are equivalent.

Equivalent Statements: Conditional statement p  q If the car will start, then the battery is charged. Contrapositive ~q  ~p If the battery is not charged, then the car will not start.

Equivalent Statements Converse q  p If the battery is charged, then the car will start. Inverse ~p  ~q If the car will not start, then the battery is not charged.

Example 3: Using inductive reasoning Andrea knows that Robin is a sophomore and Todd is a junior. All the other juniors that Andrea knows are older than Robin. Therefore, Andrea reasons inductively that Todd is older than Robin based on past observations.

Using the Laws of Logic Deductive reasoning uses facts, definitions, and accepted properties in a logical order to write a logical argument. This differs from inductive reasoning, in which previous examples and patterns are used to form a conjecture.

Deductive Reasoning Andrea knows that Todd is older than Chan. She also knows that Chan is older than Robin. Andrea reasons deductively that Todd is older than Robin based on accepted statements.

Law of Detachment If p  q is a true conditional statement There is a specific example where p is true, then must q is true.

Example Determine if the following conclusions are true from the law of Detachment. a. If you are at least 16 years old, you can get a drivers license. b. Peter is 16 years old. c. Peter can get a drivers license.

Example If two angles form a linear pair, then they are supplementary;  A and  B are supplementary. So,  A and  B form a linear pair. What about two separate angles whose sums happen to add up to 180  but aren’t adjacent.

You try… Use the law of detachment to draw a conclusion If a student gets an A on the final exam, then the student will pass the course. Felicia gets an A on her music theory final exam.

Law of syllogism If p  q and q  r are true conditional statements, then p  r is true. Example 5: Use the law of syllogism to draw a conclusion from the following true statements.

Example If a bird is the fastest bird on land, then it is the largest of all birds. If a bird is the largest of all birds, then it is an ostrich. If a bird is a bee hummingbird, then it is the smallest of all birds. If a bird is the largest of all birds, then it is flightless. If a bird is the smallest bird, then it has a nest the size of a walnut half-shell.

Example 5 continued A. If a bird is the fastest bird on land, then it is an ostrich. (use 1 and 2.) B. If a bird is a hummingbird, then it has a nest the size of a walnut half-shell (Use 3 and 5). If a bird is the fastest bird on land, then it is flightless (Use 1 and 4).

Example: Deductive Reasoning If Mike visits Alabama, then he will spend a day in Montgomery. If Mike spends a day in Montgomery, then he will visit the Civil Rights Memorial.

Solution Let p, q and r represent the following: P: Mike visits Alabama Q: Mike spends a day in Alabama. R: Mike visits the Civil Rights Memorial p  q is true q  r is true; so p  r is true (Law of Syllogism).

In other words If Mike visits Alabama, then he will visit the Civil Rights Memorial. You are told that Mike visited Alabama which means p is true. Using the Law of Detachment, you can conclude that he visited the Civil Rights Memorial.

Assignment Pg #’s 2-20 even We will be going over this Homework page 87 Quiz TOMORROW